Výsledky vyhledávání - "Toader, Rodica"

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Visco-energetic solutions for a model of crack growth in brittle materials

Autor: Maso, Gianni Dal, Rossi, Riccarda, Savaré, Giuseppe, Toader, Rodica

Visco-energetic solutions have been recently advanced as a new solution concept for rate-independent systems, alternative to energetic solutions/quasistatic evolutions and balanced viscosity solutions. In the spirit of this novel concept, we revisit

Externí odkaz: http://arxiv.org/abs/2105.00046

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Rate-independent damage in thermo-viscoelastic materials with inertia

Autor: Lazzaroni, Giuliano, Rossi, Riccarda, Thomas, Marita, Toader, Rodica

We present a model for rate-independent, unidirectional, partial damage in visco-elastic materials with inertia and thermal effects. The damage process is modeled by means of an internal variable, governed by a rate-independent flow rule. The heat eq

Externí odkaz: http://arxiv.org/abs/1804.07902

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Akademický článek

Two-point boundary value problems for planar systems: A lower and upper solutions approach

Autor: Fonda, Alessandro, Sfecci, Andrea, Toader, Rodica

Publikováno v: In Journal of Differential Equations 25 January 2022 308:507-544

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Akademický článek

On the Cauchy problem for the wave equation on time-dependent domains

Autor: Dal Maso, Gianni, Toader, Rodica

Publikováno v: In Journal of Differential Equations 5 March 2019 266(6):3209-3246

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Akademický článek

Quasistatic crack growth in elasto-plastic materials with hardening: The antiplane case.

Autor: Dal Maso, Gianni, Toader, Rodica

Publikováno v: Advances in Calculus of Variations; Apr2024, Vol. 17 Issue 2, p487-502, 16p

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An artificial viscosity approach to quasistatic crack growth

Autor: Toader, Rodica, Zanini, Chiara

We introduce a new model of irreversible quasistatic crack growth in which the evolution of cracks is the limit of a suitably modified $\epsilon$-gradient flow of the energy functional, as the "viscosity" parameter $\epsilon$ tends to zero.
Comm

Externí odkaz: http://arxiv.org/abs/math/0607596

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On a notion of unilateral slope for the Mumford-Shah functional

Autor: Maso, Gianni Dal, Toader, Rodica

In this paper we introduce a notion of unilateral slope for the Mumford-Shah functional, and provide an explicit formula in the case of smooth cracks. We show that the slope is not lower semicontinuous and study the corresponding relaxed functional.

Externí odkaz: http://arxiv.org/abs/math/0410525

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Quasistatic crack growth in finite elasticity

Autor: Maso, Gianni Dal, Francfort, Gilles A., Toader, Rodica

In this paper, we prove a new existence result for a variational model of crack growth in brittle materials proposed in [15]. We consider the case of $n$-dimensional finite elasticity, for an arbitrary $n\ge1$, with a quasiconvex bulk energy and with

Externí odkaz: http://arxiv.org/abs/math/0401196

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